Conformal symmetry

In mathematical physics, the conformal symmetry of spacetime is expressed by an extension of the Poincaré group, known as the conformal group; in layman's terms, it refers to the fact that stretching, compressing or otherwise distorting spacetime preserves the angles between lines or curves that exist within spacetime.[citation needed]

Conformal symmetry encompasses special conformal transformations and dilations. In three spatial plus one time dimensions, conformal symmetry has 15 degrees of freedom: ten for the Poincaré group, four for special conformal transformations, and one for a dilation.

Harry Bateman and Ebenezer Cunningham were the first to study the conformal symmetry of Maxwell's equations. They called a generic expression of conformal symmetry a spherical wave transformation. General relativity in two spacetime dimensions also enjoys conformal symmetry.[1]

Generators

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The Lie algebra of the conformal group has the following representation:[2]

where are the Lorentz generators, generates translations, generates scaling transformations (also known as dilatations or dilations) and generates the special conformal transformations.

Commutation relations

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The commutation relations are as follows:[2]

other commutators vanish. Here is the Minkowski metric tensor.

Additionally, is a scalar and is a covariant vector under the Lorentz transformations.

The special conformal transformations are given by[3]

where is a parameter describing the transformation. This special conformal transformation can also be written as , where

which shows that it consists of an inversion, followed by a translation, followed by a second inversion.

A coordinate grid prior to a special conformal transformation
The same grid after a special conformal transformation

In two-dimensional spacetime, the transformations of the conformal group are the conformal transformations. There are infinitely many of them.

In more than two dimensions, Euclidean conformal transformations map circles to circles, and hyperspheres to hyperspheres with a straight line considered a degenerate circle and a hyperplane a degenerate hypercircle.

In more than two Lorentzian dimensions, conformal transformations map null rays to null rays and light cones to light cones, with a null hyperplane being a degenerate light cone.

Applications

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Conformal field theory

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In relativistic quantum field theories, the possibility of symmetries is strictly restricted by Coleman–Mandula theorem under physically reasonable assumptions. The largest possible global symmetry group of a non-supersymmetric interacting field theory is a direct product of the conformal group with an internal group.[4] Such theories are known as conformal field theories.

Second-order phase transitions

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One particular application is to critical phenomena in systems with local interactions. Fluctuations[clarification needed] in such systems are conformally invariant at the critical point. That allows for classification of universality classes of phase transitions in terms of conformal field theories

Conformal invariance is also present in two-dimensional turbulence at high Reynolds number.[citation needed]

High-energy physics

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Many theories studied in high-energy physics admit conformal symmetry due to it typically being implied by local scale invariance. A famous example is d=4, N=4 supersymmetric Yang–Mills theory due its relevance for AdS/CFT correspondence. Also, the worldsheet in string theory is described by a two-dimensional conformal field theory coupled to two-dimensional gravity.

Mathematical proofs of conformal invariance in lattice models

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Physicists have found that many lattice models become conformally invariant in the critical limit. However, mathematical proofs of these results have only appeared much later, and only in some cases.

In 2010, the mathematician Stanislav Smirnov was awarded the Fields medal "for the proof of conformal invariance of percolation and the planar Ising model in statistical physics".[5]

In 2020, the mathematician Hugo Duminil-Copin and his collaborators proved that rotational invariance exists at the boundary between phases in many physical systems.[6][7]

See also

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References

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  1. ^ "gravity - What makes General Relativity conformal variant?". Physics Stack Exchange. Retrieved 2020-05-01.
  2. ^ a b Di Francesco, Mathieu & Sénéchal 1997, p. 98.
  3. ^ Di Francesco, Mathieu & Sénéchal 1997, p. 97.
  4. ^ Juan Maldacena; Alexander Zhiboedov (2013). "Constraining conformal field theories with a higher spin symmetry". Journal of Physics A: Mathematical and Theoretical. 46 (21): 214011. arXiv:1112.1016. Bibcode:2013JPhA...46u4011M. doi:10.1088/1751-8113/46/21/214011. S2CID 56398780.
  5. ^ Rehmeyer, Julie (19 August 2010). "Stanislav Smirnov profile" (PDF). International Congress of Mathematicians. Archived from the original (PDF) on 7 March 2012. Retrieved 19 August 2010.
  6. ^ "Mathematicians Prove Symmetry of Phase Transitions". Wired. ISSN 1059-1028. Retrieved 2021-07-14.
  7. ^ Duminil-Copin, Hugo; Kozlowski, Karol Kajetan; Krachun, Dmitry; Manolescu, Ioan; Oulamara, Mendes (2020-12-21). "Rotational invariance in critical planar lattice models". arXiv:2012.11672 [math.PR].

Sources

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